Is it right to say that "the number that can not be opened is irrational "? Is it right to say that the number that can not be opened is irrational?

Is it right to say that "the number that can not be opened is irrational "? Is it right to say that the number that can not be opened is irrational?

No, that is not the definition of irrational numbers.
An irrational number is a number in a real number that can not be accurately expressed as the ratio of two integers, i.e., infinite non-recurring decimals, such as pi, square root of 2, etc.
A number that is open to the square is probably a rational number, such as 3 and 7.
If the square root is an infinite non-circulating decimal, it is an irrational number, for example, the root number 7 is an irrational number, or any other infinite non-circulating decimal is an irrational number.

No, that is not the definition of irrational numbers.
An irrational number is a number in a real number that can not be accurately expressed as the ratio of two integers, i.e., infinite non-recurring decimals, such as pi, square root of 2, etc.
A number that is open to the square is probably a rational number, such as 3 and 7.
If the square root is an infinite non-recurring decimal, it is an irrational number, for example, the root number 7 is an irrational number, or any other infinite non-circulating decimal is an irrational number.

Isn't it true that "irrational numbers are numbers that can not be opened "? By the way, let's give you an example. Isn't it true that "irrational numbers are numbers that can not be opened "? By the way, let's give you an example,

No, for example,2 is a number that the square can't open. It is of course a rational number. An irrational number is an incomparable number (a number that can not be turned into a fraction), such as the square or pi of 2.